The combinatorics of normal subgroups in the unipotent upper triangular group

Abstract

Describing the conjugacy classes of the unipotent upper triangular groups UTn(Fq) uniformly (for all or many values of n and q) is a nearly impossible task. This paper takes on the related problem of describing the normal subgroups of UTn(Fq). For q a prime, a bijection will be established between these subgroups and pairs of combinatorial objects with labels from Fq×. Each pair comprises a loopless binary matroid and a tight splice, an apparently new kind of combinatorial object which interpolates between nonnesting partitions and shortened polyominoes. For arbitrary q, the same approach describes a natural subset of normal subgroups: those which correspond to the ideals of the Lie algebra utn(Fq) under an approximation of the exponential map.